On the Diophantine equation Un-bm = c

Abstract

Let (Un)n∈ N be a fixed linear recurrence sequence defined over the integers (with some technical restrictions). We prove that there exist effectively computable constants B and N0 such that for any b,c∈ Z with b> B the equation Un - bm = c has at most two distinct solutions (n,m)∈ N2 with n≥ N0 and m≥ 1. Moreover, we apply our result to the special case of Tribonacci numbers given by T1= T2=1, T3=2 and Tn=Tn-1+Tn-2+Tn-3 for n≥ 4. By means of the LLL-algorithm and continued fraction reduction we are able to prove N0=1.1· 1037 and B=e438. The corresponding reduction algorithm is implemented in Sage.